edits

[lambda.git] / zipper-lists-continuations.mdwn

diff --git a/zipper-lists-continuations.mdwn b/zipper-lists-continuations.mdwn
index a2603db..0ef9436 100644 (file)
--- a/zipper-lists-continuations.mdwn
+++ b/zipper-lists-continuations.mdwn
@@ -275,7 +275,7 @@ similar to the List monad just given:
 type 'a continuation = ('a -> 'b) -> 'b
 c_unit (x:'a) = fun (p:'a -> 'b) -> p x
 c_bind (u:('a -> 'b) -> 'b) (f: 'a -> ('c -> 'd) -> 'd): ('c -> 'd) -> 'd =
 type 'a continuation = ('a -> 'b) -> 'b
 c_unit (x:'a) = fun (p:'a -> 'b) -> p x
 c_bind (u:('a -> 'b) -> 'b) (f: 'a -> ('c -> 'd) -> 'd): ('c -> 'd) -> 'd =

-fun (k:'a -> 'b) -> u (fun (x:'a) -> f x k)
+  fun (k:'a -> 'b) -> u (fun (x:'a) -> f x k)

 </pre>
 
 How similar is it to the List monad?  Let's examine the type
 </pre>
 
 How similar is it to the List monad?  Let's examine the type


@@ -294,16 +294,15 @@ parallel in a deep sense.  To emphasize the parallel, we can
 instantiate the type of the list' monad using the Ocaml list type:
 
     type 'a c_list = ('a -> 'a list) -> 'a list
 instantiate the type of the list' monad using the Ocaml list type:
 
     type 'a c_list = ('a -> 'a list) -> 'a list

-    let c_list_unit x = fun f -> f x;;
-    let c_list_bind u f = fun k -> u (fun x -> f x k);;

 
 

-Have we really discovered that lists are secretly continuations?
-Or have we merely found a way of simulating lists using list
+Have we really discovered that lists are secretly continuations?  Or
+have we merely found a way of simulating lists using list

 continuations?  Both perspectives are valid, and we can use our
 intuitions about the list monad to understand continuations, and vice
 continuations?  Both perspectives are valid, and we can use our
 intuitions about the list monad to understand continuations, and vice

-versa.  The connections will be expecially relevant when we consider 
-indefinites and Hamblin semantics on the linguistic side, and
-non-determinism on the list monad side.
+versa (not to mention our intuitions about primitive recursion in
+Church numerals too).  The connections will be expecially relevant
+when we consider indefinites and Hamblin semantics on the linguistic
+side, and non-determinism on the list monad side.

 
 Refunctionalizing zippers
 -------------------------
 
 Refunctionalizing zippers
 -------------------------